Necessary Conditions for Fredholmness of Singular Integral Operators with Shifts and Slowly Oscillating Data

Abstract

Suppose α is an orientation-preserving diffeomorphism (shift) of +=(0,∞) onto itself with the only fixed points 0 and ∞. In KKLsufficiency we found sufficient conditions for the Fredholmness of the singular integral operator with shift \[ (aI-bWα)P++(cI-dWα)P- \] acting on Lp(+) with 1<p<∞, where P=(I S)/2, S is the Cauchy singular integral operator, and Wα f=fα is the shift operator, under the assumptions that the coefficients a,b,c,d and the derivative α' of the shift are bounded and continuous on + and may admit discontinuities of slowly oscillating type at 0 and ∞. Now we prove that those conditions are also necessary.